In this work, recursive formulas facilitating the computation of very complex tensor integrals over the unit circle, are obtained by making use of the divergence theorem and mathematical induction. Using these formulas, the integrals over the unit circle of polynomials with any high degree are easily computed. © 2011 Elsevier Ltd. All rights reserved
We show that integrating a polynomial of degree t on an arbitrary simplex (with respect to Lebesgue ...
AbstractThe main objective of this work is the implementation of recursive formulas allowing the int...
International audienceWe show that integrating a polynomial of degree t on an arbitrary simplex (wit...
AbstractThe main objective of this work is the implementation of recursive formulas allowing the int...
AbstractIn this work, recursive formulas facilitating the computation of very complex tensor integra...
AbstractThis paper deals with the numerical calculation of integrals over the unit circle in the com...
© 2014 Elsevier B.V. All rights reserved. In this paper we give a survey of some results concerning ...
We establish a relation between Gauss quadrature formulas on the interval [-1,1] that approximate in...
Interpolatory quadrature formulas with uniformly distributed nodes over the unit circle in the compl...
AbstractQuadrature formulas on the unit circle were introduced by Jones in 1989. On the other hand, ...
This paper concerns with analytical integration of trivariate polynomials over linear polyhedra in E...
Quadrature formulas on the unit circle were introduced by Jones et al. in 1989. On the other hand, B...
AbstractIn the present paper we characterize the measures on the unit circle for which there exists ...
AbstractThis paper deals with the numerical calculation of integrals over the unit circle in the com...
International audienceWe show that integrating a polynomial of degree t on an arbitrary simplex (wit...
We show that integrating a polynomial of degree t on an arbitrary simplex (with respect to Lebesgue ...
AbstractThe main objective of this work is the implementation of recursive formulas allowing the int...
International audienceWe show that integrating a polynomial of degree t on an arbitrary simplex (wit...
AbstractThe main objective of this work is the implementation of recursive formulas allowing the int...
AbstractIn this work, recursive formulas facilitating the computation of very complex tensor integra...
AbstractThis paper deals with the numerical calculation of integrals over the unit circle in the com...
© 2014 Elsevier B.V. All rights reserved. In this paper we give a survey of some results concerning ...
We establish a relation between Gauss quadrature formulas on the interval [-1,1] that approximate in...
Interpolatory quadrature formulas with uniformly distributed nodes over the unit circle in the compl...
AbstractQuadrature formulas on the unit circle were introduced by Jones in 1989. On the other hand, ...
This paper concerns with analytical integration of trivariate polynomials over linear polyhedra in E...
Quadrature formulas on the unit circle were introduced by Jones et al. in 1989. On the other hand, B...
AbstractIn the present paper we characterize the measures on the unit circle for which there exists ...
AbstractThis paper deals with the numerical calculation of integrals over the unit circle in the com...
International audienceWe show that integrating a polynomial of degree t on an arbitrary simplex (wit...
We show that integrating a polynomial of degree t on an arbitrary simplex (with respect to Lebesgue ...
AbstractThe main objective of this work is the implementation of recursive formulas allowing the int...
International audienceWe show that integrating a polynomial of degree t on an arbitrary simplex (wit...
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